On a linear functional for infinitely divisible moving average random fields

Abstract

Given a low-frequency sample of the infinitely divisible moving average random field \∫Rdf(t-x) (dx), t∈ Rd\, in [13] we proposed an estimator uv0 for the function R x u(x)v0(x)=(uv0)(x), with u(x)=x and v0 being the L\'evy density of the integrator random measure . In this paper, we study asymptotic properties of the linear functional L2(R) v v,uv0 L2(R), if the (known) kernel function f has a compact support. We provide conditions that ensure consistency (in mean) and prove a central limit theorem for it.